MATHEMATICS CM - Home - crashMATHS...MATHEMATICS AS PAPER 1 Gold Set A (Edexcel Version) Time...
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MATHEMATICSAS PAPER 1
Gold Set A (Edexcel Version) Time allowed: 2 hours
Instructions to candidates:
• In the boxes above, write your centre number, candidate number, your surname, other names
and signature.
• Answer ALL of the questions.
• You must write your answer for each question in the spaces provided.
• You may use a calculator.
Information to candidates:
• Full marks may only be obtained for answers to ALL of the questions.
• The marks for individual questions and parts of the questions are shown in round brackets.
• There are 12 questions in this question paper. The total mark for this paper is 100.
Advice to candidates:
• You should ensure your answers to parts of the question are clearly labelled.
• You should show sufficient working to make your workings clear to the Examiner.
• Answers without working may not gain full credit.
CM
AS/M/P1© 2019 crashMATHS Ltd.
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Surname
Other Names
Candidate Signature
Centre Number Candidate Number
Examiner Comments Total Marks
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1
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Relative to a fixed origin O, the points A and C have position vectors –4i – 2j and i + 8j respectively.
The point B lies on the straight line segment AC such that the ratio AB : BC = 2 : 3.
(a) Find the position vector of B relative to O. (3)
The point D is such that OBCD is a parallelogram.
(b) Find the distance of the point D from O. (2)
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2 The curve C has the equation
where k is a constant.
The point P is a stationary point on C and has x coordinate 4.
(a) Find the y coordinate of P. Show your working clearly. (5)
(b) Show that P is the only stationary point on C and determine its nature. (4)
y = x3 + kx
, x > 0
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3 (a) Given that log2 c = m and log16 d = n, express in the form 2y, where y is an expression
in terms of m and n. (4)
(b) Solve the equation
giving your answer to three significant figures. (4)
c3
d
4 x × 52−x = 73−2x
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(a) Show that the equation
has two equal roots. (3)
(b) Hence, or otherwise, solve the equation
Give your answer in the form , where a and b are rational numbers to be found. Show all of your working. (3)
(2 2 − 2)x2 + 8x + (1+ 2) = 0
(2 2 − 2)x2 + 8x + (1+ 2) = 0
a + b 2
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5
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(a) Show that 5 – 3 sin2 x > 0 for all x. (2)
(b) For 0 ≤ x < 360o, solve the equation
giving your answers to one decimal place. (5)
(c) Explain how you have used part (a) in your answer to part (b). (1)
log4 (5 − 3sin2 x) = 1
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12
6
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A biologist is studying the population of fish in a lake.
He models the number of fish in the lake, N fish, to vary according to
where t is the time in years since the start of the study and A, B and C are positive constants.
At the start of the study, the population of fish in the lake is 50.
The population of fish in the lake tripled in the first year.
The limiting size of the population is 5000.
Find the values of A, B and C in the model. (6)
N = A1+ Be−Ct , t ≥ 0
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(a) In ascending powers of x, find the first three terms in the binomial expansion of
up to and including the term in x2. (4)
(b) Given that n is a positive integer, use the definition
to prove that . (2)
In the expansion of (5x + 1)p, where p is a positive integer, the coefficient of x2 is 700.
(c) Find the value of p. (2)
nCr =n!
r! n − r( )!nC2 =
12n(n −1)
2 + x3
⎛⎝⎜
⎞⎠⎟ 3− x
5⎛⎝⎜
⎞⎠⎟5
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Use the limit definition of the derivative twice to prove that
(5)
d2
dx2(x2 − 2x3) = 2 −12x
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9
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Figure 1 above shows two straight lines, l1 and l2.
The line l1 has the equation 2x – 4y – 10 = 0.
Given that l1 and l2 are perpendicular,
(a) find the gradient of l2. (2)
The line l2 crosses the x axis and the y axis at the points A and B respectively.
The area of the triangle OAB is 4 units2, where O is the origin.
(b) Find the coordinates of A and B. (4)
(c) Hence, determine the equation of the line l2. Give your answer in the form ax + by + c = 0, where a, b and c are integers to be found. (1)
The lines l1 and l2 intersect at the point C. The point D is where l1 meets the y axis.
(d) Calculate the area of the quadrilateral OACD. (5)
l2 l1
y
xA O
C
B
D
Figure 1
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Figure 2 shows the triangle ABC which has AB = a cm, BC = b cm and AC = 14 cm. The perimeter of the triangle is 40 cm.
Given that the angle ACB is θ,
(a) show that . (4)
(b) Hence, show that the area of the triangle, A cm2, satisfies
(4)
(c) (i) Find the maximum area of the triangle ABC. (4)
(ii) State what type of triangle ABC is when its area is a maximum. (1)
cosθ = 137− 1207b
A2 = −120b2 + 3120b −14400
A
B
C
a cm b cm
14 cm
Figure 2
θ
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Figure 3 shows a sketch of the curve C with equation y = f(x), where
f(x) = (x – 1)(x + 3)(x + k)
where k is a constant.
(a) Sketch the curve with equation y = f(x + 2). On your sketch, show clearly the coordinates of any points where the curve crosses or meets the coordinate axes. (3)
The point A has coordinates (–k, 0). The point B is where C intersects the y axis.
The finite region R, shown shaded in Figure 3, is bounded by the curve C, the x axis, the lines x = –k and x = 1 and the line segment AB.
Given that the area of the shaded region R is ,
(b) show that 9k2 + 10k – 56 = 0. (7)
(c) Hence, find the value of k. (1)
y
x1−3 −k
A
B
R
Figure 3
11912
O
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Leigh models the interaction of an octopus and a fish.
The octopus is able to catch the fish if it swims within a 5 metre radius of its position.
Leigh models the octopus as a fixed particle located at the point (–7, 5).
She models the fish as a particle that swims on a path defined by y = kx + 6.
The unit of distance for Leigh’s coordinate system is metres.
(a) Find the set of values of k such that the octopus does not catch the fish. (8)
(b) State one limitation of the model. (1)
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END OF PAPER
TOTAL FOR PAPER IS 100 MARKS
TOTAL 9 MARKS